A triangle has sides A, B, and C. The angle between sides A and B is (pi)/6π6 and the angle between sides B and C is pi/6π6. If side B has a length of 2, what is the area of the triangle?

1 Answer
Dean R.
Apr 23, 2018

No! Stop doing that! A triangle doesn't have sides A, B and C! Triangle ABC has vertices A, B and C and corresponding opposing sides a, b a,b and c.c. It's much easier if we do it like this every time.

This problem should read: What is the area of a triangle ABC labeled in the usual way with A=C=pi/6A=C=π6 and b=2b=2?

I really don't like trig as taught in school because every problem is 30,60,90 or 45,45,90. It's like we have a whole subject that only works for two triangles.

Boy I'm grumpy today. I'll stop griping and just do the problem.

We have A=C=pi/6=30^circA=C=π6=30. That's an isosceles triangle. So half of it will be a right triangle, with side b/2b2, side (and altitude of the original triangle) hh, which satisfies

h = b/2 tanA h=b2tanA

Call the area mathcal{A}.

mathcal{A} = 1/2 b h = b^2/{4 tan A} = {2^2}/{4 tan 30} =\sqrt{3}

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